64 CHAPTER 2 • COMPLEX F UNCTIONSare mapped onto points that lie on the ray p > 0, </> = 2a. If we now restrict the
domain of w = f (z) = z^2 to the region
{
A = re' ·o : r > 0 and -'Ir 7r}2
< (J :S
2
, (2-6)then the image of A under the mapping w = z^2 can be described by the set
B = {pe•
0 and - 7r < </> :S 7r} , (2-7)
which consists of all points in t he w plane except the point w = 0.
The inverse mapping off, which we denote g , is thenwhere w E B. That is,
.l 1. Arg(w)
z = g(w) = w• = lwl' e'-,-,where w f 0. The function g is so important that we call special attention to it
with a formal definition.I Definition 2.1: Principal sq uare root
The function
I i • A<•(w)g(w) = w'l = lwl~ e•-,-, for w f 0,
is called the principal square r oot functio n.(2-8)We leave as an exercise to show that f and g satisfy Equations (2-3) and
thus are inverses of each other that map the set A one-to-one and onto the set B
and the set B one-to-one and onto the set A, respectively. Figure 2.12 illustrates
this relationship.What a.re the images of rectangles under t he mapping w = z^2? To find out,
we use the Cartesian formw = u+iv = f (z) = z^2 = x^2 - y^2 +i2xy = (x^2 - y^2 , 2x y) = (u, v)
and the resulting system of equationsu = x^2 -y^2 and v = 2 xy. (2-9)
• EXAMPLE 2.12 Show that the transformation w = f (z) = z^2 , for z f 0,
usually maps vertical and horizontal lines onto parabolas and use this fact to
find the image of the rectangle {(x, y): 0 < x <a, 0 < y < b}.